Computing Power Indices in Weighted Majority Games with Formal Power Series

Abstract

In this paper, we propose fast pseudo-polynomial-time algorithms for computing power indices in weighted majority games. We show that we can compute the Banzhaf index for all players in O(n+q (q)) time, where n is the number of players and q is a given quota. Moreover, we prove that the Shapley--Shubik index for all players can be computed in O(nq (q)) time. Our algorithms are faster than existing algorithms when q=2o(n). Our algorithms exploit efficient computation techniques for formal power series.

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